Monday, October 31, 2016

The ordinary sentence "There are four chairs in my office" is true (in its ordinary context). Furthermore, its being true tells us very little about fundamental ontology. Fundamental physical reality could be made out of a single field, a handful of fields, particles in three-dimensional space, particles in ten-dimensional space, a single vector in a Hilbert space, etc., and yet the sentence could be true.

An interesting consequence: Even if in fact physical reality is made out of particles in three-dimensional space, we should not analyze the sentence to mean that there are four disjoint pluralities of particles each arranged chairwise in my office. For if that were what the sentence meant, it would tell us about which of the fundamental physical ontologies is correct. Rather, the sentence is true because of a certain arrangement of particles (or fields or whatever).

If there is such a broad range of fundamental ontologies that "There are four chairs in my office" is compatible with, it seems that the sentence should also be compatible with various sceptical scenarios, such as that I am a brain in a vat being fed data from a computer simulation. In that case, the chair sentence would be true due to facts about the computer simulation, in much the way that "There are four chairs in this Minecraft house" is true. It would be very difficult to be open to a wide variety of fundamental physics stories about the chair sentence without being open to the sentence being true in virtue of facts about a computer simulation.

But now suppose that the same kind of thing is true for other sentences about physical things like tables, dogs, trees, human bodies, etc.: each of these sentences can be made true by a wide array of physical ontologies. Then it seems that nothing we say about physical things rules out sceptical scenarios: yes, I know I have two hands, but my having two hands could be grounded by facts about a computer simulation. At this point the meaningfulness of the sceptical question whether I know I am not a brain in a vat is breaking down. And with it, realism is breaking down.

In order for the sceptical question to make sense, we need the possibility of saying things that cannot simply be made true by a very wide variety of physical theories, since such things will also be made true by computer simulations. This gives us an interesting anti-reductionist argument. If the statement "I have two hands" is to be understood reductively (and I include non-Aristotelian functionalist views as reductive), then it could still be literally true in the brain-in-a-vat scenario. But if anti-reductionism about hands is true, then the statement wouldn't be true in the brain-in-a-vat scenario. And so I can deny that I am in that scenario simply by saying "I have two hands."

But maybe I am moving too fast here. Maybe "I have two hands" could be literally true in a brain-in-a-vat scenario. Suppose that the anti-reductionism consists of there being Aristotelian forms of hands (presumably accidental forms). But if, for all we know, the form of a hand can inform a bunch of particles, a fact about a vector or the region of a field, then the form of a hand can also inform an aspect of a computer simulation. And so, for all we know, I can literally and non-reductively have hands even if I am a brain in a vat. I am not sure, however, that I need to worry about this. What is important is form, not the precise material substrate. If physical reality is the memory of a giant computer but it isn't a mere simulation but is in fact informed by a multiplicity of substantial and accidental forms corresponding to people, trees, hands, hearts, etc., and these forms are real entities, then the scenario does not seem to me to be a sceptical scenario.

Friday, October 28, 2016

Suppose we are four-dimensional. Parthood simpliciter then is an eternal relation between, typically, four-dimensional entities. My heart is a four-dimensional object that is eternally a part of me, who am another four-dimensional object.

But there is surely also such a thing as having a part at a time t. Thus, in utero my umbilical cord was a part of me, but it no longer is. What does it mean to have a part at a time? Here is the simplest thing to say:

x is a part of y at t if and only if x is a part of y and both x and y exist at t.

But (1) then has a very interesting metaphysical consequence that only a few Aristotelian philosophers endorse: parts cannot survive being accreted by or excreted from the whole. For if, say, my finger survived its removal from the whole (and not just because I became a scattered object), there would be a time at which my finger would exist but wouldn’t be a part of me. And that violates (1) together with the eternality of parthood simpliciter.

This may seem to be a reductio of (1). But if we reject (1), what do we put in its place, assuming four-dimensionalism? I suspect we will have to posit a second relation of parthood, parthood-at-a-time, which is not reducible to parthood simpliciter. And that seems to be unduly complex.

So I propose that the four-dimensionalist embrace (1) and conclude to the thesis that parts cannot survive their accretion or excretion.

According to dualist survivalism, at death our bodies perish but we continue to exist with nothing but a soul (until, Christians believe, the resurrection of the dead, when we regain our bodies).

A lot of the arguments against dualist survivalism focus on how we could exist as mere souls. First, such existence seems to violate weak supplementation: my souls is proper part of me, but if the body perished, my soul would be my only part—and yet it would still be a proper part (since identity is necessary). Second, it seems to be an essential property of animals that they are embodied, an essential property of humans that they are animals, and an essential property of us that we are humans.

There are answers to these kinds of worries in the literature, but I want to note that things become much simpler for the dualist survivalist if she accepts a four-dimensionalism that says that we are four-dimensional beings (this won't be endurantist, but it might not be perdurantist either).

First, there will be a time t after my death (and before the resurrection) such that the only proper part of mine that is located at t is my soul. However, the soul won’t be my only part. My arms, legs and brain are eternally my parts. It’s just that they aren’t located at t, as the only proper part of me that is located at t is my soul. There is no violation of weak supplementation. (We still get a violation of weak supplementation for the derived relation of parthood-at-t, where x is a part-at-t of y provided that x is a part of y and both x and y exist at t. But why think there is weak supplementation for parthood-at-t? We certainly wouldn’t expect weak supplementation to hold for parthood-at-z, where z is a spatial location and x is a part-at-z of y provided that x is a part of y and both x and y are located at z.)

Second, it need not follow from its being an essential property of animals that they are embodied that they have bodies at every time at which they exist. Compare: It may be an essential property of a cell that it is nucleated. But the cell is bigger spatially than the nucleus, so it had better not follow that the nucleus exists at every spatial location at which the cell does. So why think that the body needs to exist at every temporal location at which the animal does? Why can’t the animal be bigger temporally than its body?

Of course, those given to three-dimensional thinking will say that I am missing crucial differences between space and time.

Thursday, October 27, 2016

Plausibly, having satisfied desires contributes to my well-being and having unsatisfied desires contributes to my ill-being, at least in the case of rational desires. But there are infinitely many things that I’d like to know and only finitely many that I do know, and my desire here is rational. So my desire and knowledge state contributes infinite misery to me. But it does not. So something’s gone wrong.

That’s too quick. Maybe the things that I know are things that I more strongly desire to know than the things that I don’t know, to such a degree that the contribution to my well-being from the finite number of things I know outweighs the contribution to my ill-being from the infinite number of things I don’t know. In my case, I think this objection holds, since I take myself to know the central truths of the Christian faith, and I take that to make me know things that I most want to know: who I am, what I should do, what the point of my life is, etc. And this may well outweigh the infinitely many things that I don’t know.

Yes, but I can tweak the argument. Consider some area of my knowledge. Perhaps my knowledge of noncommutative geometry. There is way more that I don’t know than that I know, and I can’t say that the things that I do know are ones that I desire so much more strongly to know than the ones I don’t know so as to balance them out. But I don’t think I am made more miserable by my desire and knowledge state with respect to noncommutative geometry. If I neither knew anything nor cared to know anything about noncommutative geometry, I wouldn’t be any better off.

Thinking about this suggests there are three different strengths in a desire:

Sp: preferential strength, determined by which things one is inclined to choose over which.

Sh: happiness strength, determined by how happy having the desire fulfilled makes one.

Sm: misery strength, determined by how miserable having the desire unfulfilled makes one.

It is natural to hypothesize that (a) the contribution to well-being is Sh when the desire is fulfilled and −Sm when it is unfulfilled, and (b) in a rational agent, Sp = Sh + Sm. As a result of (b), one can have the same preferential strength, but differently divided between the happiness and misery strengths. For instance, there may be a degree of pain such that the preferential strength of my desire not to have that pain equals the preferential strength of my desire to know whether the Goldbach Conjecture is true. I would be indifferent whether to avoid the pain or learn whether the Goldbach Conjecture is true. But they are differently divided: in the pain case Sm >> Sh and in the Goldbach case Sm << Sh.

There might be some desires where Sm = 0. In those cases we think “It would be nice…” For instance, I might have a desire that some celebrity be my friend. Here, Sm = 0: I am in no way made miserable by having that desire be unfulfilled, although the desire might have significant preferential strength—there might be significant goods I would be willing trade for that friendship. On the other hand, when I desire that a colleague be my friend, quite likely Sm >> 0: I would pine if the friendship weren’t there.

(We might think a hedonist has a story about all this: Sh measures how pleasant it is to have the desire fulfilled and Sm measures how painful the unfulfilled desire is. But that story is mistaken. For instance, consider my desire that people not say bad things behind my back in such a way that I never find out. Here, Sm &gt> 0, but there is no pain in having the desire unfulfilled, since when it’s unfulfilled I don’t know about it.)

Wednesday, October 26, 2016

I’ve been thinking about the phrase “x should know that s”. (There is probably a literature on this, but blogging just wouldn’t be as much fun if one had to look up the literature!) We use this phrase—or its disjunctive variant “x knows or should know that s”—very readily, without its calling for much evidence about x.

“As an engineer Alice should know that more redundancy was needed in this design.”

“Bob knows or should know that his behavior is unprofessional for a librarian.”

“Carl should have known that genocide is wrong.”

Here’s a sense of “x should know that s”: x has some relevant role R and it is normal for those in R to know that s under the relevant circumstances. In that sense, to say that x should know that s we don’t need to know anything specific about x’s history or mental state, other than that x has role R. Rather, we need to know about R: it is normal engineering practice to build in sufficient redundancy; librarians have an unwritten code of professional behavior; human beings normally have a moral law written in their hearts.

This role-based sense of “should know” is enough to justify treating x as a poor exemplar of the role R when x does not in fact know that s. When R is a contingent role, like engineer or librarian, it could be a sufficient for drumming x out of R.

But we sometimes seem use a “should know” claim to underwrite moral blame. And the normative story I just gave about “should know” isn’t strong enough for that. Alice might have had a really poor education as an engineer, and couldn’t have known better. If the education was sufficiently poor, we might kick her out of the profession, but we shouldn’t blame her morally.

Carl, of course, is a case apart. Carl’s ignorance makes him a defective human being, not just a defective engineer or librarian. Still a defective human being is not the same as a morally blameworthy human being. And in Carl’s case we can’t drum him out of the relevant role without being able to levy moral blame on him, as drumming him out of humanity is, presumably, capital punishment. However, we can lock him up for the protection of society.

On the other hand, we could take “x should know that s” as saying something about x’s state, like that it is x’s own fault if x doesn’t know. But in that case, I think people often use the phrase without sufficient justification. Yes, it’s normal to know that genocide is wrong. But we live in a fallen world where people can fall very far short of what is normal through no fault of their own, by virtue of physical and mental disease, the intellectual influence of others, and so on.

I worry that in common use the phrase “x should know that s” has two rationally incompatible features:

Monday, October 24, 2016

Bob decides that if he ever has the opportunity to sacrifice his life to protect his innocent comrades, he’ll do it.

We praise Alice. But as for Bob, while we commend his moral judgment, we think that he is not yet in the crucible of character. Bob’s resolve has not yet been tested. And it’s not just that it hasn’t been tested. Alice’s decision not only reveals but also constitutes her as a courageous individual. Bob’s decision falls short both in the revealing but also in the constituting department (it’s not his fault, of course, that the opportunity hasn’t come up).

Now compare Alice and Bob to Carl:

Carl knows that tomorrow he’ll have the opportunity to sacrifice his life to protect his innocent comrades, and he decides he will make the sacrifice.

Carl is more like Bob than like Alice. It’s true that Carl’s decision is unconditional while Bob’s is conditional. But even though Carl’s decision is unconditional, it’s not final. Carl knows (at least on the most obvious way of spelling out the story) that he will have another opportunity to decide come tomorrow, just as Bob will still have to make a final decision once the opportunity comes up.

I am not sure how much Bob and Carl actually count as deciding. They are figuring out what would or will (respectively) be the thing to do. They are making a prediction (hypothetical or future-oriented) about their action. They may even be trying by an act of will to form their character so as to determine that they would or will make the sacrifice. But if they know how human beings function, they know that their attempt is very unlikely to be successful: they would or will still have a real choice to make. And in the end it probably wouldn’t surprise us too much if, put to the test, Bob and Carl failed to make the sacrifice.

Alice did something decisive. Bob and Carl have yet to do so. There is an important sense in which only Alice decided to sacrifice her life.

The above were cases of laudable action. But what about the negative side? We could suppose that David steals from his employer; Erin decides that she will steal if she has the opportunity; and Frank knows he’ll have the opportunity to steal and decides he’ll take it.

I think we’ll blame Erin and Frank much more than we’ll praise Bob and Carl (this is an empirical prediction—feel free to test it). But I think that’s wrong. Erin and Frank haven’t yet gone into the relevant crucible of character, just as Bob and Carl haven’t. Bob and Carl may be praiseworthy for their present state; Erin and Frank may be blameworthy for theirs. But the praise and the blame shouldn’t go quite as far as in the case of Alice and David, respectively. (Of course, any one of the six people might for some other reason, say ignorance, fail to be blameworthy or praiseworthy.)

Thursday, October 20, 2016

If Alice pulls the trigger intending to kill the wolverine and the wolverine survives, then necessarily Alice’s action is a failure.

But suppose that Bob intends to get to the mall, starts his car, changes his mind, and drives off for a hike in the woods. None of the actions described is a failure. He just changed his mind.

If nanoseconds after the bullet leaving the muzzle Alice changed her mind, and it so happens the wolverine survived, it is still true that Alice’s action failed. Given her intention, she tried to kill the wolverine, and failed.

In the change of mind case, Bob, however, didn’t try to get to the mall. Rather, he tried to start to get to the mall, and he also started trying to get to the mall. His trying to start was successful—he did start to get to the mall. But it makes no sense to attribute either success or failure to a mere start of trying.

There seems to be a moral difference, too. Suppose that killing the wolverine and getting to the mall are both wrong (maybe the wolverine is no danger to Alice, and Bob has promised his girlfriend not to go to this mall). Then Alice gets the opprobrium of being an attempted wolverine killer by virtue of (1), while Bob isn’t yet an attempted mall visitor by virtue of (2)—only when he strives to propel his body through the door does he become an attempted mall visitor. Even if killing the wolverine and getting to the mall are equally wrong, Bob has done something less bad—for the action he took in virtue of (2) was open to the possibility of changing his mind, as bringing it to completion would require further voluntary decisions. What Bob did was still wicked, but less so than what Alice did.

Action (1) commits Alice to killing the wolverine: if the wolverine fails to die, Alice is still an attempted wolverine killer. But Bob has undertaken no commitment to visiting the mall by starting the car.

This suggests to me that perhaps “intends” may be used in different senses in (1) and (2). In (1), it may be an “intends” that commits Alice to wolverine killing; in (2), it may be an “intends” that only commits Bob to starting trying to visit the mall. In (1), we have an intending that p that constitutes an action as a trying to bring it about that p.

Tuesday, October 18, 2016

This morning, I set out to walk to the Philosophy Department. If asked my intention, I might have said that it was to reach the Department. And in actual fact I did reach it. Suppose, however, that as I was walking, my wife phoned me to inform me of a serious family emergency that required me to turn back, and that I did in fact turn back.

Here’s a puzzle. The family emergency in this (fortunately) hypothetical scenario seems to have frustrated my intention to reach the Department. On the other hand, surely I did not intend to reach the Department no matter what. That would have been quite wicked (imagine that I could only reach the Department by murdering someone). If I did not intend to reach the Department no matter what, it seems that my intention was conditional, such as to reach the Department barring the unforeseen. But the unforeseen happened, so my conditional intention wasn’t frustrated—it was mooted. If I intend to fail a student if he doesn’t turn in his homework, and he turns in his homework, my intention is not frustrated. So my intention was frustrated and not frustrated, it seems.

Perhaps rather than my intention being frustrated, it was my desire to reach the Department that was frustrated. But that need not be the case. Suppose, contrary to fact, that I was dreading my logic class today and would have appreciated any good excuse to bail on it. Then either I had no desire to reach the Department or my desire was conditional again: to reach the Department unless I can get out of my logic class. In neither case was my desire frustrated.

Let me try a different solution. I intended to reach the Department by morally licit means. The phone call made it impossible for me to reach the Department by morally licit means—reaching the Department would have required me to neglect my family. My intention wasn’t relevantly conditional, but included a stipulation as to the means. Thus my intention was frustrated when it became impossible for me to reach the Department by morally licit means.

The above suggests that our intentions should generally be thus limited in respect of means, unless the means are explicitly specified all the way down (and they probably never are). Otherwise, our intention wickedly commits us to wicked courses of action in some possible circumstances. Of course, the limitation, just as the intention itself, will typically be implicit.

Monday, October 17, 2016

The probability of a proposition p equals the probability that p is true. I have argued that this principle refutes open future views. It’s interesting that it also refutes the many-worlds interpretation of quantum mechanics.

Suppose that I have prepared an electron mixed spin state 2−1/2|↑⟩+2−1/2|↓⟩ and we are about to measure whether the spin is up or down. The Born rule says that I should assign probability 1/2 to each of the two possible measurements. But by the many-worlds interpretation, the world splits into two (or more—but I will ignore that complication as nothing hangs on the number, or even the number being being well-defined) branches: in one an electron in a spin-up state is observed and in the other one in a spin down state is observed. Now consider these two propositions:

I will observe a spin-up state.

I will observe a spin-down state.

Given the many-worlds interpretation, metaphysically reality is symmetric with respect to these two propositions, as reality includes branches with both observes and with the observer standing in the same relationship to me. Hence, either both are true or neither is true on the correct reading of the many-worlds metaphysics: both are true if the observer in both branches counts as me, and otherwise both propositions are false. If the correct reading of the metaphysics is that both are true, then the probability of each being true is 1, and hence by the principle I started the post with, the probability that I will observe a spin-up state is 1 and so is the probability that I will observe a spin-down state. If the correct reading of the metaphysics is that neither is true, then the probability of truth for each will be 0, and hence the probability of my making either observation is 0.

So, the probabilities of (1) and (2) are 0 or 1. In neither case are they 1/2, which is what the Born rule stipulates.

This seems to me to be a stronger argument than the more common argument against the many-worlds interpretation that all branches should have equal probability, and hence would violate the Born rule in cases where the quantum state has unequal weights. For the usual argument depends on indifference, which is a dubious principle.

Parents have the authority to command their children and parents have a special duty to care for children. Officers have special duties of care for those under their command. The state likewise has special duties of care for those under its jurisdiction. Special duties of care do not imply authority: adult siblings have special duties of care to one another but do not have jurisdiction over one another. But we can hypothesize that authority implies special duties of care.

Why would that be so? One possibility is that authority always arises out of special duties of care: in some cases, in order to properly care for y one must have authority over y. That fits neatly with the parent-child case, but doesn't fit with the military case, where the authority seems explanatory of the duties of care, or at least not posterior to it. But in the military case we might say this: in paradigmatic cases (putting to one side the case of mercenaries), the officer's authority derives from the state's authority. And the state's authority may well arise out of special duties of care for its citizens, whom the state can thus induct, voluntarily or not, into the military.

This more general pattern can fit cases which don't fit the simple version of the authority-care hypothesis. For instance, perhaps, a judge has commanding authority over a convicted prisoner but does not have special duties of care for the prisoner. But the judge's authority derives from the state's authority, which is explained by the state's special duties towards its citizens. So the more refined hypothesis is something like this: The authority to command is connected with special duties of care, but the special duties of care need not be had by the one who has the authority to command--the authority to command may have been deputized from another who had both the authority and the special duties.

But what about this case: Sometimes a state will imprison those who are not under its care but who have harmed its citizens. One example is prisoners of war. Another is the case of seizing a criminal from another country, as in the case of Manuel Noriega. I could wimpily say that the hypothesis is just a general rule with exceptions. But perhaps what I should instead say is that the case of prisoners of war and criminals seized from abroad is not a case of authority to command and hence no exception to the hypothesis. While an imprisoned citizen does violate duties of obedience to the state in escaping, the prisoner of war or criminal seized from abroad do not violate any such duties of obedience in escaping. There may be a limited commanding authority, however, derived from duties of care. Thus, an officer in charge of a prisoner of war camp might have commanding authority in respect of keeping order at food lines. And in even other cases there may be moral reasons to obey not because of authority but in order to maintain order, which is good in itself.

So let's suppose the hypothesis is correct. We now come to two of the most interesting cases: God and self. If the hypothesis is true, then God's absolute commanding authority over us derives from God's duty to love us. That's surprising, but may be right. The case of self is even more interesting. While we may not, strictly speaking, have commanding authority over ourselves (though "promises to self" might be an example), the authority we have over ourselves goes beyond most cases of commanding authority. Does that authority, too, derive from duties to care for ourselves? I like that idea, but many will not like the idea of duties to care for ourselves.

Thursday, October 13, 2016

Of course, the most controversial premise is (1), though I could also imagine a defender of suicide denying (2) in the case of voluntary enslavement. One reason to accept (1) is something like this:

If suicide is permissible, then we have ultimate authority over our own lives.

If we have ultimate authority over our own lives, then it is permissible and valid for us to sell ourselves into slavery.

If it is permissible and valid for us to sell ourselves into slavery, then slavery is permissible.

So, if suicide is permissible, then slavery is permissible.

By "valid", I mean that the sale would actually work: that authority over our lives would be transferred to another. The notion of "ultimate authority" is rather foggy and I think (4) and (5) can be questioned. But I still think it's an argument worth developing, as all three premises (4)-(6) have some plausibility.

Another line of thought in favor of (1) is:

If suicide is permissible, it is permissible and valid to deputize another to unconditionally kill one.

If it is permissible and valid to deputize another to unconditionally kill one, it is permissible and valid to deputize another to kill one at will.

If it is permissible and valid to deputize another to kill one at will, then it is permissible and valid to sell oneself into slavery.

If it is permissible and valid to sell oneself into slavery, then slavery is permissible.

Here, valid deputization is a deputization that actually succeeds in giving the other the requisite authority. The thought behind (10) is that if one give life-and-death authority over oneself to another, one can a fortiori give the other kinds of authority that define the master-slave relationship.

Wednesday, October 12, 2016

Joe thinks chess is an evil game and creates a killer robot tasked with killing the greatest chess player on earth, whoever it might be. The robot succeeds with the task. Joe is clearly a murderer, not merely an attempted murderer. But suppose Joe is the greatest chess player on earth, though he had no suspicion of this fact. Then Joe has committed suicide. And is a murderer. Hence a suicide can be a kind of murder.

Tuesday, October 11, 2016

Suppose I toss infinitely many fair coins. By the Law of Large Numbers (and assuming an appropriate version of the Axiom of Choice), with probability one I will have infinitely many heads and infinitely many tails. But what if I toss an uncountable infinity of fair coins, and I want to know whether I will get uncountably many heads and uncountably many tails? Intuitively, surely I will. It would seem really unfair if I only got countably many heads and all but uncountably many were tails (or the other way around)!

But the usual mathematical model for this situation offers no such guarantee. Let I be an uncountable index set, let Ω = {H, T}I be the space of coin toss outcomes indexed by I, and let P be the completion of the product P0 of I-many fair coin flip measures on {H, T}. Let UX be the subset of Ω where there are uncountably many Xs (where X = H or X = T). It can be proved (see Appendix) that UX is saturated nonmeasurable, i.e., any measurable subset of it has zero probability and any measurable superset of it has probability one.

The same is true (and with the same proof) if we ask what the probability is that there is some specific cardinality κ of heads (or of tails), where ℵ0 < κ ≤ ∥I∥. Again, we come up against a saturated nonmeasurable set of outcomes.

So what? Well, this leads to a mildly interesting technical problem for the Albert-Loewer many-minds interpretation of quantum mechanics. Albert and Loewer want their many-minds interpretation to allow for the supervenience of minds on the wavefunction. This requires that every branch of the multiverse always be populated by the same cardinality of minds. To ensure this, they prepopulate every branch with continuum-many minds, in the hope that every branching will keep continuum-many minds in every branch. But the above result shows that there is no guarantee of this. If continuum-many minds each, as it were, flip a coin whether to take branch H or branch T, we cannot even say that it’s likely that continuum-many will take each branch.

This might seem very interesting: it might seem to entirely undercut the physicalist supervenience behind their story. But that’s going too far. For it may be that the completion of the product measure on the coin-flip space {H, T}I isn’t the right model. It may be that we should extend the measure to assign probability 1 to UH and to UT. This can, indeed, be mathematically done. (I haven’t checked to make sure that one can keep all the intuitive symmetries in the probability space, though.) Though in fact we can extend to assign other probabilities, too (though it then may be impossible to keep the symmetries).

Appendix: Sketch of proof that UX is saturated measurable: Suppose that A is a non-empty P0-measurable set. Then A is defined by a constraint on countably many of the factors in Ω. But no such constraint suffices can ensure that every member of A has uncountably many Xs (unless it ensures that A is empty), and hence it is not the case that A ⊆ UX. It follows that the only subsets of UX that are P-measurable have null measure. But for exactly the same kind of reason, a non-empty P0-measurable set A cannot be a subset of the complement Ω − UX either. For then the constraint on countably many factors would have to guarantee the lack of uncountably many Xs, while allowing A to be non-empty, and that’s impossible. It follows that the only supersets of UX that are P-measurable have full measure.

Monday, October 10, 2016

I should warn readers that all my posts on quantum stuff are very, very sketchy. I'm very much learning the material.

In my exploration of many-minds interpretations of quantum mechanics, I’ve been trying to figure out how the many-minds dynamics could work without using problematic notion of a “local” or “effective” wavefunction. Here’s a way I like.

Start with a privileged set O of commuting observables whose values would be sufficient to ground the phenomenal states of all minded beings. Perhaps particle positions will do.

Now let’s suppose we have a modal interpretation with O as the privileged set of observables and with an appropriate dynamics (like the one here).

Attach immaterial minds to the systems described by O, and have them travel along with the systems.

But now do a switcheroo: instead of supposing the observables in O to describe physical reality, ground their values in properties of the minds. If O is phenomenally distinguishable, i.e., if any two distinct assignments of values to the observables in O will result in different ensembles of phenomenal states, then we don’t need to posit properties of minds over and beyond the phenomenal ones here. But if O is too rich to be phenomenally distinguishable, we will need to suppose unconscious properties of the minds to ground the values of the observables in O.

This yields something closer to the Squires-Barrett Traveling Minds variant of Albert and Loewer’s Single Mind View, rather than the many-minds view. (In particular, there is no problem of meeting “mindless hulks”.)

If O determines all particle positions, then the result is a Leibnizified Bohm-like theory where particle positions are grounded in the properties of monads (minds).

If we want many-minds, then we just do the above uncountably infinitely often for each different assignment of values to members of O.

Suppose at t1 there are countably infinitely many people with red hats and countably infinitely many people with black hats. You’re one of them and you can’t see anybody hat (including your own). What probability you should attach to the proposition that your hat is red depends on the causal history rather than on what the world is like at t1.

For consider two causal histories, each of which results in the same time slice at t1. In the first history, we start with infinitely many hatless people at t0, and for each one we flip a fair coin to see if they get a red or a black hat. Then we arrange the people in a (bidirectionally infinite) line of alternating hat colors. In the second history, we start the same way, but now our coin is unfair, so any given person has only a 1/4 chance of getting a red hat and a 3/4 chance of getting a black hat. But again after the fact the people are arranged in an infinite line of alternating hat colors.

In the two scenarios, the outputs at t1 are relevantly alike—an infinite line of people of alternating hat colors—but what probability you should assign to the proposition that your hat is red depends on which causal history actually took place. So probabilities don’t just depend on how things are now, but also on how things were. At least when we’re dealing with infinities.

I am exploring what seem to me to be under-explored parts of the logical space of interpretations of Quantum Mechanics. I may be wasting my time: there may be good reasons why those parts of logical space are not explored much. But I am also hoping that such exploration will broaden my mind.

So, here’s a curious interpretation: multi-Bohm. Assume no collapse as in Everett. At any given time t, there is the set St of all particle position assignments compatible with the value of the wavefunction ψ(t) (we can extend to spin and other things in the same way that Bohm gets extended to spin and other things). Typically, this set will include every possible position assignment, and will have continuum cardinality.

Now on Bohm’s interpretation, one member of St is privileged: it is the actual positions of the particles. But drop that privileging. Suppose instead that all the assignments of St are on par. Then St gives us a synchronic decomposition of the Everettian multiverse into "branches". Now stitch the synchronic decomposition into trajectories using the guiding equation: a position assignment st ∈ St is part of the same trajectory as a position assignment st′ ∈ St′ if and only if the guiding equation evolves st into st′ over the time span from t to t′ given the actual wavefunction ψ.

We can think of the above as a story with infinitely many (continuum many) parallel Bohmian universes. But that bloats the ontology by including infinitely many ensembles of particles. Since the wavefunction fully determines the sets St of position assignments (or so I assume—there are some worries about null-measure stuff that I am not perfectly sure of), we can stop thinking about real particles and just as a way of speaking superimposed on top of the many-worlds interpretation.

This means that we can interpret the many-worlds interpretation not as a branching-worlds story, but as a deterministic parallel worlds reading. For given the two-way (I assume) determinism in the guiding equation, the trajectories never meet: the branches always stay separate and parallel. Moreover, the probability problem of the many-worlds interpretation is unsolved, and so we cannot say that the story fits better with one set of experimental results rather than another.

Friday, October 7, 2016

The branching many worlds interpretation of quantum mechanics famously faces the problem of why it is appropriate to interpret the weights in the wavefunction as probabilities. The many minds interpretation is designed to solve this problem. Infinitely many minds traverse the branching multiverse, and move in accordance with objective chances defined by the wavefunction. It sounds like everything is just fine probabilistically: each mind's movements are nicely stochastic.

Yes, the movements are, but what about the initial setup of the minds? Presumably minds come on the scene when in some branch of the multiverse matter is so arranged as to form something like a brain. And infinitely minds come into existence then. But much earlier than evolution has managed to produce brains on earth, the branching multiverse will have branches with Boltzmann brains: brains that come into existence randomly out of quantum fluctuations in little bubbles of order. Some of these Boltzmann brains will have brain states exactly like ours. And each Boltzmann brain, on the many minds interpretation, will get infinitely many minds. So am I associated with a real brain or a Boltzmann brain? There are infinitely many minds with states like mind associated with a real brain and infinitely many minds with states like mine associated with a Boltzmann brain. The infinities are, presumably, the same. So how is it that I know that I have two hands?

Here's one move that a defender of many minds could make. Assume a pre-existing infinite bucket of minds, existing unconsciously apart from the physical universe. Consider all the brain-coming-into-existence events throughout the multiverse and across time. Assign probabilities to these brain-coming-into-existence events in proportion to the weight assigned the event by the wavefunction. Now add this dynamics: Whenever a brain-coming-into-existence event happens, each mind in the infinite bucket has the indicated probability of getting pulled out of the bucket and connected with this brain. Then as long as we're confident that, roughly, the number of Boltzmann brains weighted by the probabilities is less than the number of normal brains weighted by the probabilities, it seems all should be well.

There are potential technical problems with the normalization of the probabilities. Also, there is the issue that the metaphysics now seems excessively dualistic, in that we are supposing that bucket of minds independent of the physics from which the minds are pulled. Maybe one could just suppose a bucket of mind-haecceities? I am not sure.

This post is inspired by remarks Rob Koons made about retrospective probabilities in the many worlds interpretation. Essentially the point of this post is that that problem isn't solved by the many minds interpretation.

Thursday, October 6, 2016

It's occurred to me that on most non-Bohmian interpretations of quantum mechanics, we end up being in a superposition of the kind of universe we think we're in and a sceptical scenario, e.g., some brain in a vat scenario, though details of the scenario may differ depending on an interpretation. All that's needed for that to happen is for there to have been a non-zero chance of a sceptical scenario with the same phenomenal states that we actually have. I don't know if this is a problem if the sceptical scenario is assigned low weight by the wavefunction.

Wednesday, October 5, 2016

Consider Jeffrey Barrett's traveling minds interpretation of Quantum Mechanics (see also here). On this interpretation, minds traverse a branching Everett-style multiverse in accordance with the probabilities given by the Born rule. But unlike on the Albert-Loewer many-minds interpretation, the minds are constrained to travel together: they are always found in the same branch of the universe.

Here is something interesting about the position in logical space of this interpretation. It is a hidden-variables interpretation in the sense that it supposes that there are realities that cannot be reduced to the wavefunction. The hidden variables on this story correspond to facts about brain states. For instance, the wavefunction may place my brain in a superposition of a brain state in which I feel I am sitting with a state in which I feel I am standing, but the minds (jointly) pick out a branch of the wavefunction--the one in which I feel I am sitting (and writing a post on quantum mechanics). Notice, however, that the hidden variables in this story are hidden from the wavefunction but not hidden from us: they are phenomenally accessible to us.

Interestingly, the Bohm interpretation can be seen also to be a hidden-variables interpretation where the variables are not entirely hidden from us. For presumably it is the "hidden" positions of the particles that determine the brain state that gives rise to my phenomenal state. So from my phenomenal state, I can tell something about the hidden variables--for instance, that they comprise a brain. Bohm is a paradigmatic hidden variable interpretation, and yet it does not actually hide the variables from us. So we need to be cautious about the phrase "hidden variables".

I think the Albert-Loewer many-minds interpretation is also a hidden variable theory. The variables are the states of the many minds. But there is a difference between the Barrett and Albert-Lower interpretations, on the one hand, and the Bohm interpretation, on the other. In the Bohm interpretation, the hidden variables are a part of physical reality. On the mind-based interpretations, the hidden variables are a part of mental reality. In all cases, we have at least partial access to the hidden variables.

I've got a big DIY urge. My motivations usually include being too cheap to buy something (typically because I'm saving up for something else--right now, a 3D printer). A fair amount of the time there is vanity--wanting to brag online, say. Sometimes perhaps there is a minor motivation (which really should be much stronger) to repair things rather than wastefully throwing them out. And sometimes the activity itself is very pleasant (I really enjoy using power tools like a sewing machine, a drill press or a stand mixer; I like the smell of solder rosin or freshly cut softwood wafting in the air). But I think often the strongest motivation is the intrinsic pull of doing things myself.

According to Aquinas, that motivation is why Satan sinned. He wanted the good things that God was going to give to him, but he didn't want them from God--he wanted getting them himself. In other words, the first sin is Pelagianism.

This makes me a bit worried about my DIY urge. Is it an echo of the Satanic pride that led to the downfall of the universe?

Not necessarily. Aquinas' discussion of the first sin is driven by two theses: (a) Satan was very smart and (b) Satan's motivations were good. So Aquinas needs needs to identify a good motivation that led him to sin, not simply by a stupid mistake. It is thus central to Aquinas' story that the DIY urge that Satan had was a good motivation: there is a genuine good in achieving good things by oneself. But in order to achieve that good, Satan refused God's gift of grace, settling for (lesser, presumably) goods that he could get by himself.

The fundamental motivation behind the DIY urge is good, thus. But there is a serious danger that it misses what St. John Paul II called our "nuptial nature": that it is our nature to give ourselves to others and to receive others' gift of themselves. Satan refused God's gift. The parallel danger in the DIY case is that it not turn into a refusal of the gift of others' creativity and labor, a refusal to acknowledge that (to use older language) we are social animals.

Of course, the products of commerce are not gifts personally directed to us. (After all, we have to pay for them!) But there is a sense in which they still have some gift-like nature. People have chosen not to be subsistence farmers, but to make stuff for others. There is an imperfect duty somewhere around here to participate in the back-and-forth of commerce, which bears some relevant resemblance to the back-and-forth of gift giving and reciprocation. And so, like all things, the DIY urge needs moderation, not just for reasons like not wasting time or avoiding vanity, but lest it become a denial of our social nature.

Tuesday, October 4, 2016

For a long time I wanted to take one of those high speed water splash pictures that I've seen other people take. I played around with controlling my Lumix GH3 camera (thanks, Dad!) via WiFi, and considered setting up a microcontroller and a light sensor to time a photo for when an object hits water, like I've seen in some instructions online.

But then I had a much, much simpler idea. Just take pictures in continuous mode. Then if I just drop an object in the water enough times, one of these times I'll capture a nice splash.

I set up a bowl in sunlight, put the camera on a tripod, set exposure time to 1/1300 s, focused manually, and started taking pictures while dropping a rubber ball (to avoid contortions, I used a wired remote). To my surprise, almost every run captured something nice-looking, even though I was only using 6 picture per second mode. And I didn't expect 1/1300 s to be good enough, but it was.

Eternalists like me can think of a still camera as a temporal microscope, stretching an image temporally.

Monday, October 3, 2016

[Note added later: A version of this argument was first discovered by Kahane.]

Consider the famous story of Mary, the neuroscientist raised in a monochrome environment who finally sees an instance of red. It has famously been argued that no matter how much science she knew before she saw red, she learned something new when she saw red, and hence there is something more to the mental life than what science says. I've always been rather sceptical of this line of argument: it just didn't seem to me that a fact was learned.

But I am now thinking--as a result of a social experience--that there is an interesting way to argue that at least in some cases like Mary's one is learning a fact when one experiences a new quale. To know the answer to a why-question is to know a fact. After all, the answer to a why-question encodes an explanation, and explanations are given by means of facts.

Now suppose that Mary instead of leading a monochrome life led a charmed life and never felt any pain. One day she stubs her toe. She learns something by stubbing her toe: what pain feels like. But again we ask: is there a fact that Mary has learned? Here then is an argument:

By learning what pain feels like, Mary learned why pain is bad.

One learns why something is the case only by learning a fact.

So learning what pain feels like is learning a fact.

I give the pain version of the argument not because I find it very plausible, but because I think some readers will find it plausible. I myself am not inclined to think that pain is intrinsically bad, and the reasons why pain is extrinsically bad were available to Mary prior to her stubbing the toe (she knew that pain distracts people from worthwhile pursuits, that it tends to go against people's desires, etc.) But even if I am not convinced by the pain case, I find it pretty plausible that there will be some value-based case where by learning what a quale is like one learns the answer to a why-question. I find particularly plausible aesthetic versions of this. Here's a case where I've had the relevant aesthetic experience: "Why is dark chocolate gustatorily valuable? Because it tastes like that!" Here's one where I haven't. Being largely insensitive to music (more a matter of the brain than the ears, I think), I don't experience music like other people do, and so I don't know why Beethoven is a great composer, though I know on the testimony of others that he is a great composer. But there are possible experiences--namely, those that normal people receive upon listening to Beethoven--such that the what-it-is-like of these experiences answers the question of why Beethoven is a great composer.

Of course, these examples won't help a value-nihilist. But why would anyone be a value-nihilist? (A question with a hook.)

About Me

I am a philosopher at Baylor University. This blog, however, does not purport to express in any way the opinions of Baylor University. Amateur science and technology work should not be taken to be approved by Baylor University. Use all information at your own risk.